AbstractThis paper provides a simplified presentation of a known algorithm for resolution of singularities (in characteristic zero). It works in the context of marked ideals and uses naturality properties with respect to open restrictions and strong equivalence, to solve a delicate glueing problem that arises when induction on the dimension of the objects considered is applied
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
Producción CientíficaThe Nash multiplicity sequence was defined by M. Lejeune-Jalabert as a non-incr...
AbstractThis paper provides a simplified presentation of a known algorithm for resolution of singula...
AbstractThis paper presents two efficient computational techniques in algebraic geometry. The first ...
AbstractWe give the description of an algorithm for the resolution of singularities, in the case of ...
We construct a characteristic polyhedral for idealistic exponents over arbitrary fields. From this w...
We construct a characteristic polyhedral for idealistic exponents over arbitrary fields. From this w...
We show a simple and fast embedded resolution of varieties and principalization of ideals in the lan...
Das Problem des Auflösens von Singularitäten besteht daraus, eine singuläre algebraische Varietät al...
The task of resolution of singularities has been one of the central topics in Algebraic Geometry fo...
The task of resolution of singularities has been one of the central topics in Algebraic Geometry fo...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
Producción CientíficaThe Nash multiplicity sequence was defined by M. Lejeune-Jalabert as a non-incr...
AbstractThis paper provides a simplified presentation of a known algorithm for resolution of singula...
AbstractThis paper presents two efficient computational techniques in algebraic geometry. The first ...
AbstractWe give the description of an algorithm for the resolution of singularities, in the case of ...
We construct a characteristic polyhedral for idealistic exponents over arbitrary fields. From this w...
We construct a characteristic polyhedral for idealistic exponents over arbitrary fields. From this w...
We show a simple and fast embedded resolution of varieties and principalization of ideals in the lan...
Das Problem des Auflösens von Singularitäten besteht daraus, eine singuläre algebraische Varietät al...
The task of resolution of singularities has been one of the central topics in Algebraic Geometry fo...
The task of resolution of singularities has been one of the central topics in Algebraic Geometry fo...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
The main proposition, Theorem 1.2, is the existence for excellent Deligne-Mumford champ of character...
Producción CientíficaThe Nash multiplicity sequence was defined by M. Lejeune-Jalabert as a non-incr...
DOI
Add to ORKG